||| A Reversed List module Data.SnocList import Data.List import Data.Fin %default total public export Cast (SnocList a) (List a) where cast sx = sx <>> [] public export Cast (List a) (SnocList a) where cast xs = Lin <>< xs %transform "fastConcat" concat {t = SnocList} {a = String} = fastConcat . cast ||| Transform to a list but keeping the contents in the spine order (term depth). public export asList : SnocList type -> List type asList = (reverse . cast) export Uninhabited (Lin = x :< xs) where uninhabited Refl impossible export Uninhabited (x :< xs = Lin) where uninhabited Refl impossible ||| True iff input is Lin public export isLin : SnocList a -> Bool isLin Lin = True isLin (sx :< x) = False ||| True iff input is (:<) public export isSnoc : SnocList a -> Bool isSnoc Lin = False isSnoc (sx :< x) = True ||| Given a predicate and a snoclist, returns a tuple consisting of the longest ||| prefix of the snoclist whose elements satisfy the predicate, and the rest of the ||| snoclist. public export spanBy : (a -> Maybe b) -> SnocList a -> (SnocList a, SnocList b) spanBy p [<] = ([<], [<]) spanBy p (xs :< x) = case p x of Just b => let (as, bs) = spanBy p xs in (as, bs :< b) Nothing => (xs :< x, [<]) export Show a => Show (SnocList a) where show xs = concat ("[< " :: intersperse ", " (show' [] xs) ++ ["]"]) where show' : List String -> SnocList a -> List String show' acc Lin = acc show' acc (xs :< x) = show' (show x :: acc) xs public export Functor SnocList where map f Lin = Lin map f (sx :< x) = (map f sx) :< (f x) public export Semigroup (SnocList a) where (<+>) = (++) public export Monoid (SnocList a) where neutral = Lin public export Foldable SnocList where foldr f z = foldr f z . (<>> []) foldl f z Lin = z foldl f z (xs :< x) = f (foldl f z xs) x null Lin = True null (_ :< _) = False toList = (<>> []) foldMap f = foldl (\xs, x => xs <+> f x) neutral public export Applicative SnocList where pure = (:<) Lin fs <*> xs = concatMap (flip map xs) fs public export Monad SnocList where xs >>= k = concatMap k xs public export Traversable SnocList where traverse _ Lin = pure Lin traverse f (xs :< x) = [| traverse f xs :< f x |] public export Alternative SnocList where empty = Lin xs <|> ys = xs ++ ys -- Why can't we just use an implementation here?! export %hint SnocBiinjective : Biinjective (:<) SnocBiinjective = MkBiinjective $ \case Refl => (Refl, Refl) ||| Find the rightmost element of the snoc-list that satisfies the predicate. public export find : (a -> Bool) -> SnocList a -> Maybe a find p Lin = Nothing find p (xs :< x) = if p x then Just x else find p xs ||| Satisfiable if `k` is a valid index into `xs`. ||| ||| @ k the potential index ||| @ xs the snoc-list into which k may be an index public export data InBounds : (k : Nat) -> (xs : SnocList a) -> Type where ||| Z is a valid index into any cons cell InFirst : InBounds Z (xs :< x) ||| Valid indices can be extended InLater : InBounds k xs -> InBounds (S k) (xs :< x) ||| Find the index (counting from right) of the rightmost element (if exists) of a ||| snoc-list that satisfies the given test, else `Nothing`. public export findIndex : (a -> Bool) -> (xs : SnocList a) -> Maybe $ Fin (length xs) findIndex _ Lin = Nothing findIndex p (xs :< x) = if p x then Just FZ else FS <$> findIndex p xs ------------------ --- Properties --- ------------------ --- Usual snoc-list append (++) --- export appendAssociative : (l, c, r : SnocList a) -> l ++ (c ++ r) = (l ++ c) ++ r appendAssociative l c [<] = Refl appendAssociative l c (sx :< _) = rewrite appendAssociative l c sx in Refl export appendLinLeftNeutral : (sx : SnocList a) -> [<] ++ sx = sx appendLinLeftNeutral [<] = Refl appendLinLeftNeutral (sx :< _) = rewrite appendLinLeftNeutral sx in Refl --- Fish (<><) and chips (<>>) appends --- export fishAsSnocAppend : (xs : SnocList a) -> (ys : List a) -> xs <>< ys = xs ++ cast ys fishAsSnocAppend xs [] = Refl fishAsSnocAppend xs (y :: ys) = do rewrite fishAsSnocAppend (xs :< y) ys rewrite fishAsSnocAppend [ (ys : List a) -> xs <>> ys = cast xs ++ ys chipsAsListAppend [<] ys = Refl chipsAsListAppend (sx :< x) ys = do rewrite chipsAsListAppend sx (x :: ys) rewrite chipsAsListAppend sx [x] rewrite sym $ appendAssociative (cast sx) [x] ys Refl --- More on append --- export toListAppend : (sx, sy : SnocList a) -> toList (sx ++ sy) = toList sx ++ toList sy toListAppend sx [<] = rewrite appendNilRightNeutral $ toList sx in Refl toListAppend sx (sy :< y) = do rewrite chipsAsListAppend sy [y] rewrite appendAssociative (cast sx) (cast sy) [y] rewrite chipsAsListAppend (sx ++ sy) [y] rewrite toListAppend sx sy Refl export castListAppend : (xs, ys : List a) -> cast {to=SnocList a} (xs ++ ys) === cast xs ++ cast ys castListAppend [] ys = rewrite appendLinLeftNeutral $ [<] <>< ys in Refl castListAppend (x::xs) ys = do rewrite fishAsSnocAppend [ cast (toList sx) === sx castToList [<] = Refl castToList (sx :< x) = do rewrite chipsAsListAppend sx [x] rewrite castListAppend (cast sx) [x] rewrite castToList sx Refl export toListCast : (xs : List a) -> toList (cast {to=SnocList a} xs) === xs toListCast [] = Refl toListCast (x::xs) = do rewrite fishAsSnocAppend [ SnocList a -> SnocList a cons x sx = [< x] ++ sx --- Folds --- export foldAppend : (f : acc -> a -> acc) -> (init : acc) -> (sx, sy : SnocList a) -> foldl f init (sx ++ sy) = foldl f (foldl f init sx) sy foldAppend f init sx [<] = Refl foldAppend f init sx (sy :< x) = rewrite foldAppend f init sx sy in Refl export snocFoldlAsListFoldl : (f : acc -> a -> acc) -> (init : acc) -> (xs : SnocList a) -> foldl f init xs = foldl f init (toList xs) snocFoldlAsListFoldl f init [<] = Refl snocFoldlAsListFoldl f init (sx :< x) = do rewrite chipsAsListAppend sx [x] rewrite snocFoldlAsListFoldl f init sx rewrite foldlAppend f init (cast sx) [x] Refl --- Filtering --- export filterAppend : (f : a -> Bool) -> (sx, sy : SnocList a) -> filter f (sx ++ sy) = filter f sx ++ filter f sy filterAppend f sx [<] = Refl filterAppend f sx (sy :< x) with (f x) _ | False = filterAppend f sx sy _ | True = rewrite filterAppend f sx sy in Refl export toListFilter : (f : a -> Bool) -> (sx : SnocList a) -> toList (filter f sx) = filter f (toList sx) toListFilter f [<] = Refl toListFilter f (sx :< x) = do rewrite chipsAsListAppend sx [x] rewrite filterAppend f (cast sx) [x] rewrite filterStepLemma rewrite toListFilter f sx Refl where filterStepLemma : toList (filter f (sx :< x)) = toList (filter f sx) ++ filter f [x] filterStepLemma with (f x) _ | False = rewrite appendNilRightNeutral $ toList $ filter f sx in Refl _ | True = rewrite chipsAsListAppend (filter f sx) [x] in Refl export filterCast : (f : a -> Bool) -> (xs : List a) -> filter f (cast {to=SnocList a} xs) = cast (filter f xs) filterCast f [] = Refl filterCast f (x::xs) = do rewrite fishAsSnocAppend [< filter f xs in Refl _ | True = rewrite fishAsSnocAppend [ c) -> (f : a -> b) -> (sx : SnocList a) -> map g (map f sx) = map (g . f) sx mapFusion g f [<] = Refl mapFusion g f (sx :< x) = rewrite mapFusion g f sx in Refl export mapAppend : (f : a -> b) -> (sx, sy : SnocList a) -> map f (sx ++ sy) = map f sx ++ map f sy mapAppend f sx [<] = Refl mapAppend f sx (sy :< x) = rewrite mapAppend f sx sy in Refl export toListMap : (f : a -> b) -> (sx : SnocList a) -> toList (map f sx) = map f (toList sx) toListMap f [<] = Refl toListMap f (sx :< x) = do rewrite chipsAsListAppend (map f sx) [f x] rewrite chipsAsListAppend sx [x] rewrite mapAppend f (toList sx) [x] rewrite toListMap f sx Refl export mapCast : (f : a -> b) -> (xs : List a) -> map f (cast {to=SnocList a} xs) = cast (map f xs) mapCast f [] = Refl mapCast f (x::xs) = do rewrite fishAsSnocAppend [ Maybe c) -> (f : a -> Maybe b) -> (sx : SnocList a) -> mapMaybe g (mapMaybe f sx) = mapMaybe (f >=> g) sx mapMaybeFusion g f [<] = Refl mapMaybeFusion g f (sx :< x) with (f x) _ | Nothing = mapMaybeFusion g f sx _ | (Just y) with (g y) _ | Nothing = mapMaybeFusion g f sx _ | (Just z) = rewrite mapMaybeFusion g f sx in Refl export mapMaybeAppend : (f : a -> Maybe b) -> (sx, sy : SnocList a) -> mapMaybe f (sx ++ sy) = mapMaybe f sx ++ mapMaybe f sy mapMaybeAppend f sx [<] = Refl mapMaybeAppend f sx (sy :< x) with (f x) _ | Nothing = mapMaybeAppend f sx sy _ | (Just y) = rewrite mapMaybeAppend f sx sy in Refl export toListMapMaybe : (f : a -> Maybe b) -> (sx : SnocList a) -> toList (mapMaybe f sx) = mapMaybe f (toList sx) toListMapMaybe f [<] = Refl toListMapMaybe f (sx :< x) = do rewrite chipsAsListAppend sx [x] rewrite mapMaybeAppend f (toList sx) [x] rewrite mapMaybeStepLemma rewrite toListMapMaybe f sx Refl where mapMaybeStepLemma : toList (mapMaybe f (sx :< x)) = toList (mapMaybe f sx) ++ mapMaybe f [x] mapMaybeStepLemma with (f x) _ | Nothing = rewrite appendNilRightNeutral $ toList $ mapMaybe f sx in Refl _ | (Just y) = rewrite chipsAsListAppend (mapMaybe f sx) [y] in Refl export mapMaybeCast : (f : a -> Maybe b) -> (xs : List a) -> mapMaybe f (cast {to=SnocList a} xs) = cast (mapMaybe f xs) mapMaybeCast f [] = Refl mapMaybeCast f (x::xs) = do rewrite fishAsSnocAppend [< mapMaybe f xs in Refl _ | (Just y) = rewrite fishAsSnocAppend [